Low level definability above large cardinals

Abstract

We study connections between definability in generalized descriptive set theory and large cardinals, under ZFC. We show that if is a limit of measurables then there is no wellorder of a subset of P() of length ≥+ which is 1(V), answering a question of L\"ucke and M\"uller. However, consistently, a Woodin cardinal exists and for every uncountable cardinal which is not a limit of measurables, there is a 1(H\\)-good wellorder of H+. If is a limit of measurables and has uncountable cofinality then there is no 1(V) almost disjoint family F⊂eq P() of cardinality >. Consistently, 1(\\) mad families and maximal independent families F⊂eq P() exist, is a limit of measurables, and more. If is weakly compact and every 1(V\\) subset of P() of cardinality > contains a perfect subset of the right kind, then there is an inner model with a weakly compact limit of measurables. We prove some related facts regarding 1(Vλ\Vλ\) when I2(λ) holds. These depend on an analysis of fixed points of linear iterations involving I2(λ)-extenders.